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Article Dans Une Revue SIAM Journal on Numerical Analysis Année : 2007

A discrete duality finite volume approach to Hodge decomposition and div-curl problems on almost arbitrary two-dimensional meshes

Résumé

We define discrete differential operators such as grad, div and curl, on general two-dimensional meshes. These operators verify discrete analogues of usual continuous theorems Green formulae, Hodge decomposition of vector fields, vector curls have a vanishing divergence and gradients have a vanishing curl.We apply these ideas to discretize div-curl systems. We give error estimates and present numerical results on several types of meshes,among which degenerating meshes and non-conforming meshes.

Domaines

Physique Nucléaire Expérimentale [nucl-ex] Physique Nucléaire Théorique [nucl-th]

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Soumis le : jeudi 31 octobre 2019-16:23:19

Dernière modification le : mercredi 3 avril 2024-10:46:03

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Dates et versions

cea-02341906 , version 1 (31-10-2019)

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S. Delcourte, K. Domelevo, P. Omnes. A discrete duality finite volume approach to Hodge decomposition and div-curl problems on almost arbitrary two-dimensional meshes. SIAM Journal on Numerical Analysis, 2007, 45, ⟨10.1137/060655031⟩. ⟨cea-02341906⟩

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